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dsp.Channelizer

Polyphase FFT analysis filter bank

Description

The dsp.Channelizer System object™ separates a broadband input signal into multiple narrow subbands using a fast Fourier transform (FFT)-based analysis filter bank. The filter bank uses a prototype lowpass filter and is implemented using a polyphase structure. You can specify the filter coefficients directly or through design parameters.

To separate a broadband signal into multiple narrow subbands:

  1. Create the dsp.Channelizer object and set its properties.

  2. Call the object with arguments, as if it were a function.

To learn more about how System objects work, see What Are System Objects?

Creation

Description

channelizer = dsp.Channelizer creates a polyphase FFT analysis filter bank System object that separates a broadband input signal into multiple narrowband output signals. This object implements the inverse operation of the dsp.ChannelSynthesizer System object.

example

channelizer = dsp.Channelizer(M) creates an M-band polyphase FFT analysis filter bank, with the NumFrequencyBands property set to M.

Example: channelizer = dsp.Channelizer(16)

example

channelizer = dsp.Channelizer(M,D) creates an M-band polyphase FFT analysis filter bank, with the DecimationFactor property set to D.

Example: channelizer = dsp.Channelizer(16,8)

channelizer = dsp.Channelizer(Name=Value) creates a channelizer with each specified property set to the specified value. For example, you can set NumTapsPerBand to 20 and StopbandAttenuation to 140.

example

Properties

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Unless otherwise indicated, properties are nontunable, which means you cannot change their values after calling the object. Objects lock when you call them, and the release function unlocks them.

If a property is tunable, you can change its value at any time.

For more information on changing property values, see System Design in MATLAB Using System Objects.

Main Properties

Number of frequency bands M into which the object separates the input broadband signal, specified as a positive integer greater than 1. This property corresponds to the number of polyphase branches and the FFT length used in the filter bank.

Data Types: single | double | int8 | int16 | int32 | int64 | uint8 | uint16 | uint32 | uint64

Decimation factor D, specified as one of these:

  • 'Number of frequency bands' –– When you change the value of the NumFrequencyBands property, the decimation factor changes automatically. (since R2024a)

  • Positive integer less than or equal to the number of frequency bands M.

If the decimation factor D equals the number of frequency bands M, then the M/D ratio equals 1, and the channelizer is known as the maximally decimated channelizer.

If the M/D ratio is greater than 1, the output sample rate is different from the channel spacing, and the channelizer is known as the non-maximally decimated channelizer. If the ratio is an integer, the channelizer is known as the integer-oversampled channelizer. If the ratio is not an integer, say 4/3, the channelizer is known as the rationally oversampled channelizer. For more details, see Algorithm.

Data Types: single | double | int8 | int16 | int32 | int64 | uint8 | uint16 | uint32 | uint64

Filter design parameters or filter coefficients, specified as one of these options:

Number of filter coefficients each polyphase branch uses, specified as a positive integer. The number of polyphase branches matches the number of frequency bands. The total number of filter coefficients for the prototype lowpass filter is given by NumFrequencyBands × NumTapsPerBand. For a given stopband attenuation, increasing the number of taps per band narrows the transition width of the filter. As a result, there is more usable bandwidth for each frequency band at the expense of increased computation.

Dependencies

To enable this property, set Specification to "Number of taps per band and stopband attenuation".

Data Types: single | double | int8 | int16 | int32 | int64 | uint8 | uint16 | uint32 | uint64

Stopband attenuation of the lowpass filter, specified as a positive real scalar in dB. This value controls the maximum amount of aliasing from one frequency band to the next. When the stopband attenuation increases, the passband ripple decreases. For a given stopband attenuation, increasing the number of taps per band narrows the transition width of the filter. As a result, there is more usable bandwidth for each frequency band at the expense of increased computation.

Dependencies

To enable this property, set Specification to "Number of taps per band and stopband attenuation".

Data Types: single | double

Coefficients of the prototype lowpass filter, specified as a row vector. The default vector of coefficients is obtained using rcosdesign(0.25,6,8,"sqrt"). There must be at least one coefficient per frequency band. If the length of the lowpass filter is less than the number of frequency bands, the object zero-pads the coefficients.

If you specify complex coefficients, the object designs a prototype filter that is centered at a nonzero frequency, also known as a bandpass filter. The modulated versions of the prototype bandpass filter appear with respect to the prototype filter and are wrapped around the frequency range [−Fs Fs]. For an example, see Channelizer with Complex Coefficients.

Tunable: Yes

Dependencies

To enable this property, set Specification to "Coefficients".

Data Types: single | double
Complex Number Support: Yes

Code Generation Properties

Allow arbitrary frame length for fixed-size input signals in the generated code, specified as true or false.

When you specify:

  • true –– The input frame length does not have to be a multiple of the decimation factor. The output of the object in the generated code is a variable-size array.

  • false –– The input frame length must be a multiple of the decimation factor.

When you specify variable-size signals, the input frame length can be arbitrary and the object ignores this property in the generated code. When you run this object in MATLAB®, the object supports arbitrary input frame lengths for fixed-size and variable-size signals and this property does not affect the object behavior.

Data Types: logical

Usage

Description

channOut = channelizer(input) separates the broadband input signal into a number of narrow band signals contained in the columns of the channelizer output.

example

Input Arguments

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Data input, specified as an L-by-1 vector or an L-by-N matrix, with N > 1.

Under most conditions, the number of inputs rows L can be arbitrary and does not have to be a multiple of the number of frequency bands. See this table for details.

Input SignalWhen you Run Object in MATLABWhen you Generate Code Using MATLAB Coder™
Fixed-sizeObject supports arbitrary input frame lengthObject supports arbitrary input frame length when you set AllowArbitraryInputLength to true while generating code
Variable-sizeObject supports arbitrary input frame lengthObject supports arbitrary input frame length

Variable-size signals change in frame length once you lock the object while the fixed-size signals remain constant. When the object does not support arbitrary frame length, the input frame length must be a multiple of the number of frequency bands.

Data Types: single | double
Complex Number Support: Yes

Output Arguments

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Channelizer output, returned as a matrix or a 3-D array.

If the input is an L-by-1 vector, then the output signal has an upper bound size of ceil(L/M)-by-M, where M is the number of frequency bands. Each narrowband signal forms a column in the output.

If the input has more than one channel, that is, it is of the form L-by-N with N > 1, then the output signal has an upper bound size of ceil(L/M)-by-M-by-N.

Data Types: single | double
Complex Number Support: Yes

Object Functions

To use an object function, specify the System object as the first input argument. For example, to release system resources of a System object named obj, use this syntax:

release(obj)

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coeffsCoefficients of prototype lowpass filter
tfReturn transfer function of overall prototype lowpass filter
polyphaseReturn polyphase matrix
freqzFrequency response of filters in channelizer
bandedgeFrequenciesCompute the band edge frequencies
centerFrequenciesCompute center frequencies
getFiltersReturn matrix of channelizer FIR filters
stepRun System object algorithm
releaseRelease resources and allow changes to System object property values and input characteristics
resetReset internal states of System object

Examples

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Channelize and synthesize a sine wave signal with multiple frequencies using an M -channel filter bank.

The M -channel filter bank contains an analysis filter bank section and a synthesis filter bank section. The dsp.Channelizer object implements the analysis filter bank section. The dsp.ChannelSynthesizer object implements the synthesis filter bank section. These objects use an efficient polyphase structure to implement the filter bank. For more details, see Polyphase Implementation under Algorithms on the object reference pages.

Initialization

Initialize the dsp.Channelizer and dsp.ChannelSynthesizer System objects. Each object is set up with 8 frequency bands, 8 polyphase branches in each filter, 12 coefficients per polyphase branch, and a stopband attenuation of 140 dB. Use a sine wave with multiple frequencies as the input signal. View the input spectrum and the output spectrum using a spectrum analyzer.

offsets = [-40,-30,-20,10,15,25,35,-15];
sinewave = dsp.SineWave(ComplexOutput=true,Frequency=offsets+(-375:125:500),...
    SamplesPerFrame=800);

channelizer = dsp.Channelizer(StopbandAttenuation=140);
synthesizer = dsp.ChannelSynthesizer(StopbandAttenuation=140);
scope = spectrumAnalyzer(ShowLegend=true,...
    SampleRate=sinewave.SampleRate,...
    ChannelNames=["Input","Output"],...
    Title="Input and Output Spectra");

Streaming

Use the channelizer to split the broadband input signal into multiple narrow bands. Then pass the multiple narrowband signals into the synthesizer, which merges these signals to form the broadband signal. Compare the spectra of the input and output signals. The input and output spectra match very closely.

for i = 1:5000
    x = sum(sinewave(),2);
    y = channelizer(x);
    v = synthesizer(y);
    scope(x,v)
end

Create a dsp.Channelizer object and set the LowpassCoefficients property to a vector of complex coefficients.

Complex Coefficients

Using firpm, determine the coefficients of a Park-McClellan's optimal equiripple FIR filter of order 30, and frequency and amplitude characteristics described by F = [0 0.2 0.4 1.0] and A = [1 1 0 0] vectors, respectively.

Create a complex version of these coefficients by multiplying with a complex exponential. The resultant frequency response is that of a bandpass filter at the specified frequency, in this case 0.4.

blowpass = firpm(30,[0 .2 .4 1],[1 1 0 0]);
N = length(blowpass)-1;
Fc = 0.4;
j = complex(0,1);
bbandpass = blowpass.*exp(j*Fc*pi*(0:N));

Channelizer

Create a dsp.Channelizer object with 4 frequency bands and set the Specification property to 'Coefficients'.

chann = dsp.Channelizer(4,Specification="Coefficients");

Pass the complex coefficients to the channelizer. The prototype filter is a bandpass filter with a center frequency of 0.4. The modulated versions of this filter appear with respect to the prototype filter and are wrapped around the frequency range [-Fs Fs].

chann.LowpassCoefficients = bbandpass
chann = 
  dsp.Channelizer with properties:

   Main
      NumFrequencyBands: 4
       DecimationFactor: 'Number of frequency bands'
          Specification: 'Coefficients'
    LowpassCoefficients: [0.0019 + 0.0000i 0.0005 + 0.0016i 0.0011 - 0.0008i 0.0051 + 0.0037i -0.0024 + 0.0073i -3.4175e-04 + 8.3704e-20i 0.0042 + 0.0128i -0.0174 + 0.0126i -0.0077 - 0.0056i -0.0070 + 0.0214i -0.0514 + 0.0000i … ] (1×31 double)

  Show all properties

Visualize the frequency response of the channelizer.

freqz(chann)

Figure contains an axes object. The axes object with xlabel Normalized Frequency ( times pi blank rad/sample), ylabel Magnitude (dB) contains 4 objects of type line.

More About

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Algorithms

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References

[1] Harris, Fredric J, Multirate Signal Processing for Communication Systems, Prentice Hall PTR, 2004.

[2] Harris, F.J., Chris Dick, and Michael Rice. "Digital Receivers and Transmitters Using Polyphase Filter Banks for Wireless Communications." IEEE® Transactions on Microwave Theory and Techniques. 51, no. 4 (2003).

Extended Capabilities

Version History

Introduced in R2016b

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